English

New bounds and constructions for constant weighted $X$-codes

Information Theory 2021-01-26 v4 Combinatorics math.IT

Abstract

As a crucial technique for integrated circuits (IC) test response compaction, XX-compact employs a special kind of codes called XX-codes for reliable compressions of the test response in the presence of unknown logic values (XXs). From a combinatorial view point, Fujiwara and Colbourn \cite{FC2010} introduced an equivalent definition of XX-codes and studied XX-codes of small weights that have good detectability and XX-tolerance. An (m,n,d,x)(m,n,d,x) XX-code is an m×nm\times n binary matrix with column vectors as its codewords. The parameters d,xd,x correspond to the test quality of the code. In this paper, bounds and constructions for constant weighted XX-codes are investigated. First, we obtain a general result on the maximum number of codewords nn for an (m,n,d,x)(m,n,d,x) XX-code of weight ww, and we further improve this lower bound for the case with x=2x=2 and w=3w=3 through the probabilistic method. Then, using tools from additive combinatorics and finite fields, we present some explicit constructions for constant weighted XX-codes with d=3,7d=3,7 and x=2x=2, which are optimal for the case when d=3,w=4d=3, w=4 and nearly optimal for the case when d=3,w=3d=3,w=3. We also consider a special class of XX-codes introduced in \cite{FC2010} and improve the best known lower bound on the maximum number of codewords for this kind of XX-codes.

Keywords

Cite

@article{arxiv.1903.06434,
  title  = {New bounds and constructions for constant weighted $X$-codes},
  author = {Xiangliang Kong and Xin Wang and Gennian Ge},
  journal= {arXiv preprint arXiv:1903.06434},
  year   = {2021}
}

Comments

14 pages, 2 figures, 1 table; accept by IEEE Transactions on Information Theory

R2 v1 2026-06-23T08:09:06.568Z